Radial operators on polyanalytic Bargmann-Segal-Fock spaces

Abstract

The paper considers bounded linear radial operators on the polyanalytic Fock spaces Fn and on the true-polyanalytic Fock spaces F(n). The orthonormal basis of normalized complex Hermite polynomials plays a crucial role in this study; it can be obtained by the orthogonalization of monomials in z and z. First, using this basis, we decompose the von Neumann algebra of radial operators, acting in Fn, into the direct sum of some matrix algebras, i.e. radial operators are represented as matrix sequences. Secondly, we prove that the radial operators, acting in F(n), are diagonal with respect to the basis of the complex Hermite polynomials belonging to F(n). We also provide direct proofs of the fundamental properties of Fn and an explicit description of the C*-algebra generated by Toeplitz operators in F(n), whose generating symbols are radial, bounded, and have finite limits at infinity.